Statistical Mechanics of Lattice Systems Volume 1: Closed-Form and Exact Solutions
Titre:
Statistical Mechanics of Lattice Systems Volume 1: Closed-Form and Exact Solutions
ISBN (Numéro international normalisé des livres):
9783662038437
Auteur personnel:
Edition:
2nd ed. 1999.
PRODUCTION_INFO:
Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1999.
Description physique:
XII, 372 p. online resource.
Collections:
Theoretical and Mathematical Physics,
Table des matières:
1. Introduction to Thermodynamics and Phase Transitions -- 2. Statistical Mechanics and the One-Dimensional Ising Model -- 3. The Mean-Field Approximation, Scaling and Critical Exponents -- 4. Antiferromagnets and Other Magnetic Systems -- 5. Lattice Gases -- 6. Solid Mixtures and the Dilute Ising Model -- 7. Cluster Variation Methods -- 8. Exact Results for Two-Dimensional Ising Models -- 9. Applications of Transform Methods -- 10. The Six-Vertex Model -- A. Appendices -- A.1 Regular Lattices -- A.2 Elliptic Integrals and Functions -- A.2.1 Elliptic Integrals -- A.2.2 Elliptic Functions -- A.2.3 Results Required for Chapter 8 -- A.3 The Water Molecule and Hydrogen Bonding -- A.4 Results for the Six-Vertex Model -- A.4.1 The Proof of I -- A.4.2 The Proof of II -- A.4.3 The Proof of III -- A.4.4 The Proof of IV -- A.5 Fourier Transforms and Series -- A.5.1 Fourier Transforms -- A.5.2 Fourier Series -- References and Author Index.
Extrait:
This two-volume work provides a comprehensive study of the statistical mechanics of lattice models. It introduces the reader to the main areas in statistical mechanics and the theory of phase transitions. The development is built on a firm mathematical and physical basis. Volume 1 contains an account of mean-field and cluster variation methods successfully used in many applications in solid-state physics and theoretical chemistry as well as an account of exact results for the Ising and six-vertex models and those derivable by transformation methods. Volume 2 includes extensive treatments of scaling theory, algebraic and real-space renormalization methods and the eight-vertex model. It also includes an account of series methods and a treatment of dimer assemblies.
Auteur ajouté:
Auteur collectif ajouté:
Accès électronique:
Full Text Available From Springer Nature Physics and Astronomy Archive Packages
Langue:
Anglais